An implicit algorithm for finding a fixed point of a Q-nonexpansive mapping in locally convex spaces
Abstract
Suppose that Q is a family of seminorms on a locally convex space E which determines the topology of E. In this paper, first we define the notation of the q-duality mappings in locally convex spaces. Then we introduce an implicit method for finding an element of the set of fixed points of a Q-nonexpansive mapping. Then we prove the convergence of the proposed implicit scheme to a fixed point of the Q-nonexpansive mapping in τQ.
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